Finite groups, commuting probability, and coprime automorphisms
Group Theory
2025-11-12 v1
Abstract
Given two subgroups of a finite group , the probability that a pair of random elements from and commutes is denoted by . Suppose that a finite group admits a group of coprime automorphisms and let . We show that, if for any distinct primes there is an -invariant Sylow -subgroup and an -invariant Sylow -subgroup of for which , then has -bounded index in (Theorem 1.2). Here stands for the second term of the upper Fitting seris of a group . We also show that, if and for any prime dividing the order of there is an -invariant Sylow -subgroup such that for all , then is bounded-by-abelian-by-bounded (Theorem 1.4).
Cite
@article{arxiv.2511.07597,
title = {Finite groups, commuting probability, and coprime automorphisms},
author = {Eloisa Detomi and Robert M. Guralnick and Marta Morigi and Pavel Shumyatsky},
journal= {arXiv preprint arXiv:2511.07597},
year = {2025}
}